Number variance of random zeros on complex manifolds

Abstract

We show that the variance of the number of simultaneous zeros of m i.i.d. Gaussian random polynomials of degree N in an open set U ⊂ Cm with smooth boundary is asymptotic to Nm-1/2 mm Vol(∂ U), where mm is a universal constant depending only on the dimension m. We also give formulas for the variance of the volume of the set of simultaneous zeros in U of k<m random degree-N polynomials on Cm. Our results hold more generally for the simultaneous zeros of random holomorphic sections of the N-th power of any positive line bundle over any m-dimensional compact K\"ahler manifold.

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